Skip to main content
padlock icon - secure page this page is secure

The β‐Extension of the Multivariable Lagrange Inversion Formula

Buy Article:

$59.00 + tax (Refund Policy)

We show that Gessel's combinatorial proof of the multivariable Lagrange inversion formula can be given a ,β‐extension, which generalizes Foata and Zeilberger's, β‐extension of MacMahon's master theorem. Moreover, we show that there is no need to use Jacobi's identity in the derivation of the Lagrange formula. Finally, combining Gessel's method and ours, we obtain a new proof of Jacobi's identity.
No References
No Citations
No Supplementary Data
No Article Media
No Metrics

Document Type: Research Article

Affiliations: Université Louis-Pasteur

Publication date: February 1, 1991

  • Access Key
  • Free content
  • Partial Free content
  • New content
  • Open access content
  • Partial Open access content
  • Subscribed content
  • Partial Subscribed content
  • Free trial content
Cookie Policy
Cookie Policy
Ingenta Connect website makes use of cookies so as to keep track of data that you have filled in. I am Happy with this Find out more